Local structure of smooth pp-adic analytic Artin stacks

Abstract

We prove [Conjecture~5.17]Clausen on the local light--profinite structure of smooth p-adic analytic Artin stacks. The argument proceeds in several reductions. First, by proving a generalization of van~Dantzig theorem for groupoids, we reduce the conjecture to the compact Hausdorff case. This reduces the conjecture to the statement that the geometric realization of a groupoid object whose object and morphism spaces are light profinite and whose source and target maps are open is light profinite. Next, we simplify the groupoid by constructing a closed skeleton; after quotienting by a clopen subgroupoid, the remaining problem reduces to proving that a profinite family of finite groups can be presented as an inverse limit of finite families of finite groups. As observed by Clausen immediately after [Conjecture~5.17]Clausen, our result implies in particular that smooth p-adic analytic Artin stacks are !-good.